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KEAM Paper 2 Mock Test - 1 - JEE MCQ


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13 Questions MCQ Test - KEAM Paper 2 Mock Test - 1

KEAM Paper 2 Mock Test - 1 for JEE 2024 is part of JEE preparation. The KEAM Paper 2 Mock Test - 1 questions and answers have been prepared according to the JEE exam syllabus.The KEAM Paper 2 Mock Test - 1 MCQs are made for JEE 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for KEAM Paper 2 Mock Test - 1 below.
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KEAM Paper 2 Mock Test - 1 - Question 1

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 1

KEAM Paper 2 Mock Test - 1 - Question 2

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 2


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KEAM Paper 2 Mock Test - 1 - Question 3

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KEAM Paper 2 Mock Test - 1 - Question 4

If f(x) is a function whose domain is symmetric about the origin, then f(x) + f(–x) is

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 4

(a, b)
g(x) = f(x) + f(–x)
g(–x) = f(–x) + f(x) = g(x)
therefore g(x) is even

KEAM Paper 2 Mock Test - 1 - Question 5

The value of log3 4log4 5log5 6log6 7log7 8log8 9 is

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 5

KEAM Paper 2 Mock Test - 1 - Question 6

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 6

KEAM Paper 2 Mock Test - 1 - Question 7

Directions: The following question has four choices, out of which ONE or MORE is/are correct.
 when a > b > 0, is equal to

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KEAM Paper 2 Mock Test - 1 - Question 8

The tangent to the circle x2 + y2 = 5 at (1, − 2) also touches the circle x2 + y2 − 8x + 6y + 20 = 0. Then the point of contact is

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 8

Tangent at (1, − 2) to x2 + y2 = 5 is 
x − 2y − 5 = 0 ... (i). 
Centre and radius of 
x2 + y2 − 8x + 6y + 20 = 0 are 
C (4, − 3) and radius r = √5.  
Perpendicular distance from 
C (4, − 3) to (i) is radius. 
∴ (i) is also a tangent to the second circle. 
Let P (h, k) be the foot of the drawn circle from C (4, − 3) on (i)
h-4/1 = k=3/-2 = - [1.4 -2. (-3)-5]  
∴ (h, k) = (3, −1)

KEAM Paper 2 Mock Test - 1 - Question 9

Cos-1 (cos7π/6) =

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KEAM Paper 2 Mock Test - 1 - Question 10

If f : [1,∞)  [2,∞) is given by f(x) = x +1/x , then f –1(x) is equal to

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KEAM Paper 2 Mock Test - 1 - Question 11

 dx is equal to

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KEAM Paper 2 Mock Test - 1 - Question 12

The equation x3 – 3x + [a] = 0, will have three real and distinct roots if –
 (where [ ] denotes the greatest integer function)

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 12

f(x) = x3 – 3x + [a]
Let [a] = t (where t will be an integer)
f(x) = x3 – 3x + t ……….(i)
⇒ f ’(x) = 3x2 – 3
⇒ f ‘(x) = 0 has two real and distinct solution which are x = 1 and x = -1
so  f(x) = 0 will have three distinct and real solution when  f (1). f(-1) < 0 ……………. (ii)
Now,
f(1) = (1)3 -3(1) + t = t – 2
f(–1) = (–1)3 – 3 (–1) + t = t + 2
From equation (ii)
(t –2)  (t + 2) < 0
⇒ t ∈ (-2, 2)
Now t = [a]
Hence [a] ∈ (-2, 2)
 ⇒ a ∈ [-1, 2)

KEAM Paper 2 Mock Test - 1 - Question 13

Let function f : R → R be defined by f(x) = cos x for x ∈ R. Then f is

Detailed Solution for KEAM Paper 2 Mock Test - 1 - Question 13

f(0) = cos 0 = 1 and f(2π) = cos (2π) = 1
So, f is not one to one and cos(x) lie between - 1 and 1.
Therefore, range is not equal to its codomain.
Hence, it is not onto.

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